This problem can be easily solved through using the point-slope formula:

 where  is the slope and  and  signify one of the given points (coordinates).

The problem provides us with two points, so that requirement is fulfilled. We may choose either one when substituting in our values. The only other requirement left is slope. The problem also provides us with this information, but it's not as obviously given. The problem specifies that the line of interest is parallel to . By definition, lines are parallel when they have the same slope. Given that information, if the two lines are parallel, the line of interest will have the same slope as the given equation: . Therefore, we have our required point and the slope. Now we may substitute in all the information and solve for the equation. 

Here, we arbitrarily choose the point .

This problem can be easily solved through using the point-slope formula:

 where  is the slope and  and  signify one of the given points (coordinates).

The problem provides us with two points, so that requirement is fulfilled. We may choose either one when substituting in our values. The only other requirement left is slope. The problem also provides us with this information, but it's not as obviously given. The problem specifies that the line of interest is parallel to a line with a slope of . By definition, lines are parallel when they have the same slope. Given that information, if the two lines are parallel, the line of interest will have the same slope as the given equation:. Therefore, we have our required point and the slope. Now we may substitute in all the information and solve for the equation. 

Here, we arbitrarily choose the point .

This problem can be easily solved through using the point-slope formula:

 where  is the slope and  and  signify one of the given points (coordinates).

The problem provides us with two points, so that requirement is fulfilled. We may choose either one when substituting in our values. The only other requirement left is slope. The problem also provides us with this information, but it's not as obviously given. The problem specifies that the line of interest is parallel to .  By definition, lines are parallel when they have the same slope. Given that information, if the two lines are parallel, the line of interest will have the same slope as the given equation: . Therefore, we have our required point and the slope. Now we may substitute in all the information and solve for the equation. 

Here, we arbitrarily choose the point .

The first thing we need to do is determine the slope of this parallel line. Recall that parallel lines have the same slope, so the slope of this new line must be .

Next, we must determine the -intercept of the line. The equation for a line is given to us by , and here we know three of the four variables in this new line: .

So when we plug in these numbers we get 

Multiply to get:

Subtract  from both sides to get:

Therefore, the equation for the line is:

If f(x) is parallel to g(x) and passes through the point (-4,8), what is the equation of f(x)?

If f(x) is parallel to g(x), then it must have the same slope. 

So,

We also know that f(x) goes through the point (-4,8)... Set up the following:

Where b is our y-intercept, which we need to solve for:

Finally, put it all together:

When finding a line that is parallel to another line, we know that the slopes must be the same.  So in the equation,

we know it has a slope of 2.  We also know the parallel line contains the point

(-1, 5)

So, we will substitute the slope as well as the point into the y-intercept formula:

Doing this, we will find b, or the y-intercept, and we can determine the line that is parallel.

Now, we know the slope of the parallel line is still 2, and now we know the y-intercept is 7.  Knowing this, we get the line

.

Therefore,  is parallel to .

In order to determine the equation, we will need to find the slope of the line connected by the two given points.

Use the slope formula to determine the slope.

Substitute the points.

Our equation parallel this line connected by the two points must have a slope of negative one-half.

The only answer that has that slope is:  

When finding the slope of a parallel line, we need to ensure we have  form.   stands for slope. Our  is  which is also the slope of the parallel line. Since we are looking for an equation, we need to reuse the  form to solve for  . We do this by plugging in our coordinates. 

 Subtract  on both sides.

Our equation is .

When finding the slope of a parallel line, we need to ensure we have  form. By subtracting  on both sides and dividing  on both sides, we get 

. 

 stands for slope. Our  is  or  which is also the slope of the parallel line. Since we are looking for an equation, we need to reuse the  form to solve for  . We do this by plugging in our coordinates. 

Subtract  on both sides.

Our equation is 

.

When finding the slope of a parallel line, we need to ensure we have  form. By  dividing  on both sides, we get 

. 

 stands for slope. Our  is  or  which is also the slope of the parallel line. Since we are looking for an equation, we need to reuse the  form to solve for  . We do this by plugging in our coordinates. 

Add  on both sides.

Our equation is 

.